Subspace metric

This article describes the induced structure on any subset (subspace) corresponding to a particular structure on a set: the structure of a metric space
View other induced structures on subspaces

Definition

Suppose ${\displaystyle (X,d_X)}$ is a metric space, and ${\displaystyle Y\subseteq X}$. The subspace metric on ${\displaystyle Y}$ is defined by simply restricting the metric on ${\displaystyle X}$ to points in ${\displaystyle Y}$. In other words, for ${\displaystyle a,b\in Y}$, we define ${\displaystyle d_Y(a,b)=d_X(a,b)}$.

Note that if we start with a geodesic metric space, the subspace metric on a subspace need not be a geodesic metric any more.